Solve the following differential equation by the form

Pablo Dennis

Pablo Dennis

Answered question

2022-03-20

Solve the following differential equation by the form of homogeneous equation. Letting y=vx
The equation: x2dydx+xy+1=0

Answer & Explanation

Jazlyn Mitchell

Jazlyn Mitchell

Beginner2022-03-21Added 14 answers

Step 1
Instead, let v=xy such that dvdx=y+xdydx
x2dydx+xy=xdvdx and so x2dydx+xy+1=xdvdx+1=0
You can solve xdvdx=1 by separating.
glikozyd3s68

glikozyd3s68

Beginner2022-03-22Added 16 answers

Step 1
Divide the proposed DE by x in order to obtain
x2y'+xy+1=0xy'+y=1x
(xy)'=1x
xy=ln|x|+k
y(x)=ln|x|x+kx
and we are done.

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